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Artigo de periodico
Efficient numerical solution of boundary identification problems: MFS with adaptive stochastic optimization (2021)
Reddy, Gujji Murali Mohan ; Nanda, P; Vynnycky, Michael ; Cuminato, José Alberto
Fonte: Applied Mathematics and Computation. Unidade: ICMC
Assuntos: PROCESSOS ESTOCÁSTICOS, PROBLEMAS DE CONTORNO
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ABNT
REDDY, Gujji Murali Mohan et al. Efficient numerical solution of boundary identification problems: MFS with adaptive stochastic optimization. Applied Mathematics and Computation, v. 409, p. 1-18, 2021Tradução . . Disponível em: https://doi.org/10.1016/j.amc.2021.126402. Acesso em: 11 set. 2024.
APA
Reddy, G. M. M., Nanda, P., Vynnycky, M., & Cuminato, J. A. (2021). Efficient numerical solution of boundary identification problems: MFS with adaptive stochastic optimization. Applied Mathematics and Computation, 409, 1-18. doi:10.1016/j.amc.2021.126402
NLM
Reddy GMM, Nanda P, Vynnycky M, Cuminato JA. Efficient numerical solution of boundary identification problems: MFS with adaptive stochastic optimization [Internet]. Applied Mathematics and Computation. 2021 ; 409 1-18.[citado 2024 set. 11 ] Available from: https://doi.org/10.1016/j.amc.2021.126402
Vancouver
Reddy GMM, Nanda P, Vynnycky M, Cuminato JA. Efficient numerical solution of boundary identification problems: MFS with adaptive stochastic optimization [Internet]. Applied Mathematics and Computation. 2021 ; 409 1-18.[citado 2024 set. 11 ] Available from: https://doi.org/10.1016/j.amc.2021.126402
Artigo de periodico
An adaptive boundary algorithm for the reconstruction of boundary and initial data using the method of fundamental solutions for the inverse Cauchy-Stefan problem (2021)
Reddy, Gujji Murali Mohan ; Nanda, P; Vynnycky, Michael ; Cuminato, José Alberto
Fonte: Computational and Applied Mathematics. Unidade: ICMC
Assuntos: PROBLEMAS INVERSOS, MÉTODOS NUMÉRICOS, ALGORITMOS
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ABNT
REDDY, Gujji Murali Mohan et al. An adaptive boundary algorithm for the reconstruction of boundary and initial data using the method of fundamental solutions for the inverse Cauchy-Stefan problem. Computational and Applied Mathematics, v. 40, p. 1-26, 2021Tradução . . Disponível em: https://doi.org/10.1007/s40314-021-01454-1. Acesso em: 11 set. 2024.
APA
Reddy, G. M. M., Nanda, P., Vynnycky, M., & Cuminato, J. A. (2021). An adaptive boundary algorithm for the reconstruction of boundary and initial data using the method of fundamental solutions for the inverse Cauchy-Stefan problem. Computational and Applied Mathematics, 40, 1-26. doi:10.1007/s40314-021-01454-1
NLM
Reddy GMM, Nanda P, Vynnycky M, Cuminato JA. An adaptive boundary algorithm for the reconstruction of boundary and initial data using the method of fundamental solutions for the inverse Cauchy-Stefan problem [Internet]. Computational and Applied Mathematics. 2021 ; 40 1-26.[citado 2024 set. 11 ] Available from: https://doi.org/10.1007/s40314-021-01454-1
Vancouver
Reddy GMM, Nanda P, Vynnycky M, Cuminato JA. An adaptive boundary algorithm for the reconstruction of boundary and initial data using the method of fundamental solutions for the inverse Cauchy-Stefan problem [Internet]. Computational and Applied Mathematics. 2021 ; 40 1-26.[citado 2024 set. 11 ] Available from: https://doi.org/10.1007/s40314-021-01454-1
Artigo de periodico
A compact FEM implementation for parabolic integro-differential equations in 2D (2020)
Reddy, Gujji Murali Mohan ; Seitenfuss, Alan Bourscheidt; Medeiros, Débora de Oliveira ; Meacci, Luca ; Assunção, Milton ; Vynnycky, Michael
Fonte: Algorithms. Unidades: EESC, ICMC
Assuntos: EQUAÇÕES INTEGRO-DIFERENCIAIS, MÉTODO DOS ELEMENTOS FINITOS
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ABNT
REDDY, Gujji Murali Mohan et al. A compact FEM implementation for parabolic integro-differential equations in 2D. Algorithms, v. 13, n. 10, p. 1-23, 2020Tradução . . Disponível em: https://doi.org/10.3390/a13100242. Acesso em: 11 set. 2024.
APA
Reddy, G. M. M., Seitenfuss, A. B., Medeiros, D. de O., Meacci, L., Assunção, M., & Vynnycky, M. (2020). A compact FEM implementation for parabolic integro-differential equations in 2D. Algorithms, 13( 10), 1-23. doi:10.3390/a13100242
NLM
Reddy GMM, Seitenfuss AB, Medeiros D de O, Meacci L, Assunção M, Vynnycky M. A compact FEM implementation for parabolic integro-differential equations in 2D [Internet]. Algorithms. 2020 ; 13( 10): 1-23.[citado 2024 set. 11 ] Available from: https://doi.org/10.3390/a13100242
Vancouver
Reddy GMM, Seitenfuss AB, Medeiros D de O, Meacci L, Assunção M, Vynnycky M. A compact FEM implementation for parabolic integro-differential equations in 2D [Internet]. Algorithms. 2020 ; 13( 10): 1-23.[citado 2024 set. 11 ] Available from: https://doi.org/10.3390/a13100242
Artigo de periodico
Biconservative submanifolds in 'S POT. N' x R and 'H POT. N' x R (2019)
Manfio, Fernando ; Turgay, N. C; Upadhyay, Abhitosh
Fonte: Journal of Geometric Analysis. Unidade: ICMC
Assuntos: GEOMETRIA DIFERENCIAL CLÁSSICA, SUPERFÍCIES MÍNIMAS
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ABNT
MANFIO, Fernando e TURGAY, N. C e UPADHYAY, Abhitosh. Biconservative submanifolds in 'S POT. N' x R and 'H POT. N' x R. Journal of Geometric Analysis, v. 29, n. Ja 2019, p. 283-298, 2019Tradução . . Disponível em: https://doi.org/10.1007/s12220-018-9990-9. Acesso em: 11 set. 2024.
APA
Manfio, F., Turgay, N. C., & Upadhyay, A. (2019). Biconservative submanifolds in 'S POT. N' x R and 'H POT. N' x R. Journal of Geometric Analysis, 29( Ja 2019), 283-298. doi:10.1007/s12220-018-9990-9
NLM
Manfio F, Turgay NC, Upadhyay A. Biconservative submanifolds in 'S POT. N' x R and 'H POT. N' x R [Internet]. Journal of Geometric Analysis. 2019 ; 29( Ja 2019): 283-298.[citado 2024 set. 11 ] Available from: https://doi.org/10.1007/s12220-018-9990-9
Vancouver
Manfio F, Turgay NC, Upadhyay A. Biconservative submanifolds in 'S POT. N' x R and 'H POT. N' x R [Internet]. Journal of Geometric Analysis. 2019 ; 29( Ja 2019): 283-298.[citado 2024 set. 11 ] Available from: https://doi.org/10.1007/s12220-018-9990-9
Artigo de periodico
Weyl modules associated to Kac–Moody Lie algebras (2016)
Rao, S. Eswara; Futorny, Vyacheslav ; Sharma, Sachin S
Fonte: Communications in Algebra. Unidade: IME
Assunto: ÁLGEBRAS DE LIE
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ABNT
RAO, S. Eswara e FUTORNY, Vyacheslav e SHARMA, Sachin S. Weyl modules associated to Kac–Moody Lie algebras. Communications in Algebra, v. 44, n. 12, p. 5045-5057, 2016Tradução . . Disponível em: https://doi.org/10.1080/00927872.2015.1130143. Acesso em: 11 set. 2024.
APA
Rao, S. E., Futorny, V., & Sharma, S. S. (2016). Weyl modules associated to Kac–Moody Lie algebras. Communications in Algebra, 44( 12), 5045-5057. doi:10.1080/00927872.2015.1130143
NLM
Rao SE, Futorny V, Sharma SS. Weyl modules associated to Kac–Moody Lie algebras [Internet]. Communications in Algebra. 2016 ; 44( 12): 5045-5057.[citado 2024 set. 11 ] Available from: https://doi.org/10.1080/00927872.2015.1130143
Vancouver
Rao SE, Futorny V, Sharma SS. Weyl modules associated to Kac–Moody Lie algebras [Internet]. Communications in Algebra. 2016 ; 44( 12): 5045-5057.[citado 2024 set. 11 ] Available from: https://doi.org/10.1080/00927872.2015.1130143
Artigo de periodico
Sigma theory and twisted conjugacy, II: Houghton groups and pure symmetric automorphism groups (2016)
Gonçalves, Daciberg Lima ; Sankaran, Parameswaran
Fonte: Pacific Journal of Mathematics. Unidade: IME
Assuntos: TEORIA DOS GRUPOS, GRUPOS SIMÉTRICOS
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ABNT
GONÇALVES, Daciberg Lima e SANKARAN, Parameswaran. Sigma theory and twisted conjugacy, II: Houghton groups and pure symmetric automorphism groups. Pacific Journal of Mathematics, v. 280, n. 2, p. 349-369, 2016Tradução . . Disponível em: https://doi.org/10.2140/pjm.2016.280.349. Acesso em: 11 set. 2024.
APA
Gonçalves, D. L., & Sankaran, P. (2016). Sigma theory and twisted conjugacy, II: Houghton groups and pure symmetric automorphism groups. Pacific Journal of Mathematics, 280( 2), 349-369. doi:10.2140/pjm.2016.280.349
NLM
Gonçalves DL, Sankaran P. Sigma theory and twisted conjugacy, II: Houghton groups and pure symmetric automorphism groups [Internet]. Pacific Journal of Mathematics. 2016 ; 280( 2): 349-369.[citado 2024 set. 11 ] Available from: https://doi.org/10.2140/pjm.2016.280.349
Vancouver
Gonçalves DL, Sankaran P. Sigma theory and twisted conjugacy, II: Houghton groups and pure symmetric automorphism groups [Internet]. Pacific Journal of Mathematics. 2016 ; 280( 2): 349-369.[citado 2024 set. 11 ] Available from: https://doi.org/10.2140/pjm.2016.280.349

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